\section{\-File \-List}
\-Here is a list of all documented files with brief descriptions\-:\begin{DoxyCompactList}
\item\contentsline{section}{include/\hyperlink{coin_8hpp}{coin.\-hpp} \\*\-Template class for coin operator. \-Coin operator $ C $ is a unitary operator in $ d $-\/dimensional \-Hilbert space. \-One implementation is \-D\-F\-T coin }{\pageref{coin_8hpp}}{}
\item\contentsline{section}{include/\hyperlink{edge__map_8hpp}{edge\-\_\-map.\-hpp} \\*\-Class that maps edges of a graph. \-Let $ G=\{V,E\} $ be a $ d $ -\/regular graph with self-\/loops. \-Then, let $ v \in V $ and $ e \in E $. \-We can label each edge $ e$ with two indices\-: $ v,k $ where $ k\in \{0,1,2,..,d-1\}$. $ e \to e(v,k)$ }{\pageref{edge__map_8hpp}}{}
\item\contentsline{section}{include/\hyperlink{graph_8hpp}{graph.\-hpp} \\*\-Class for graph. \-Graph $ G=\{V,E\} $ is made up of a set of vertices $ V $ and set of edges $ E $. \-Set $ V $ is implemented as std\-::vector$<$int$>$. \-Edge $ e \in E $ is implemented as std\-::pair$<$int,int$>$ }{\pageref{graph_8hpp}}{}
\item\contentsline{section}{include/\hyperlink{shift_8hpp}{shift.\-hpp} \\*\-Template class for shift operator. \-It acts in $ \mathcal{H}_C\otimes\mathcal{H}_V$. \-It reads $ \sum_{i \in D} \vert i \rangle\langle i \vert \otimes \Pi_i(V) $, where $ \Pi_i(V) $ is a permutation of vertices. \-Friend class of state }{\pageref{shift_8hpp}}{}
\item\contentsline{section}{include/\hyperlink{state_8hpp}{state.\-hpp} \\*\-Class for storing the state of the walker. \-State space for walker is $ \mathcal{H}_C\otimes\mathcal{H}_V $, where $ \mathcal{H}_C $ is $ d $-\/dimensional coin space, where $ d $ is the degree of the graph, and where $ \mathcal{H}_V $ is $\vert V \vert$-\/dimensional position space, where $ V$ ist the set of vertices }{\pageref{state_8hpp}}{}
\item\contentsline{section}{include/\hyperlink{transition_8hpp}{transition.\-hpp} \\*\-Class for implementing conditional transition operator. \-It is unitary operator acting in $ \mathcal{H}_C\otimes\mathcal{H}_V $ }{\pageref{transition_8hpp}}{}
\end{DoxyCompactList}
